y=(x^2-3x+2)/(x^2+x+1)的值域

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y=(x^2-3x+2)/(x^2+x+1)的值域
y=(x^2-3x+2)/(x^2+x+1)的值域

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答：
y=(x^2-3x+2)/(x^2+x+1)
因为：x^2+x+1=(x+1/2)^2+3/4>0恒成立
所以：函数的定义域为实数范围R
整理得：yx^2+yx+y=x^2-3x+2
整理得：(y-1)x^2+(y+3)x+y-2=0恒有实数解
判别式=(y+3)^2-4(y-1)(y-2)>=0
所以：y^2+6y+9-4y^2+12y-8>=0
-3y^2+18y+1>=0
3y^2-18y-1<=0
3(y^2-6y+9)-28<=0
3(y-3)^2<=28
解得：
-2√(7/3)<=y-3<=2√(7/3)
3-2√(7/3)<=y<=3+2√(7/3)
所以：值域为[3-2√(7/3)，3+2√(7/3)]

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